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A characterization of the delaunay surfaces

Published 7 Apr 2020 in math.DG | (2004.03320v1)

Abstract: In this paper we use the Alexandrov Reflection Method to obtain a characterization to embedded CMC capillary annulus $\Sigma2 \subset \mathbb{B}3$. In especial, but using a new strategy, we present a new characterization to the critical catenoid. Precisely, we show that $\Sigma \subset \mathbb{B}3$ being an embedded minimal free boundary annulus in $\mathbb{B}3$ such that $\partial \Sigma$ is invariant under reflection through a coordinates planes, then $\Sigma$ is the critical catenoid. This work is part of the second author thesis which was written in 2019.

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